In this paper, an attempt has been made to solve two inverse problems of thermoelasticity. In the first problem, an attempt has been made to determine the unknown temperature, displacement and stress functions on the outer curved surface of a thin circular plate occupying the space by applying finite Marchi-Fasulo transform technique. The heat flux for a fixed value of is a known function of z and homogeneous boundary condition of the third kind is maintained on the plane surfaces of a thin circular plate. In the second problem, an attempt has been made to determine the unknown temperature, displacement and stress functions on the outer curved surface of a thin circular plate occupying the space by applying finite Marchi-Fasulo transform technique.
In this paper, an attempt has been made to solve two inverse problems of thermoelasticity.
In the first problem, an attempt has been made to determine the unknown temperature, displacement and stress functions on the outer curved surface of a thin circular plate occupying the space by applying finite Marchi-Fasulo transform technique.
The heat flux for a fixed value of is a known function of z and homogeneous boundary condition of the third kind is maintained on the plane surfaces of a thin circular plate.
In the second problem, an attempt has been made to determine the unknown temperature, displacement and stress functions on the outer curved surface of a thin circular plate occupying the space by applying finite Marchi-Fasulo transform technique.
